# Finding all possible combinations of numbers [duplicate]

Possible Duplicate:
Combination Generator in Linq

I am looking of an algorithm (using C#) that can
find all the combinations of specified numbers.
Example:
Numbers:
1 2 3
Combinations:
1
2
3
12
13
21
23
31
32
123
132
213
231
312
321

Only rule: No repetitions of numbers

I have looked around Google, Stackoverflow, as well as numerous other sites.
I would list some of my code, but I have had no success getting anything to work along the right lines.

EDIT: The intention of this is using the generated numbers as the positions of characters in a word. I am creating a word finder, so basically this is what it is being used for:

Program generates:
0
1
01
10

From numbers: 0 1

The program got the numbers 0 and 1 from the user inputting for instance "no".

Example code:
int size = input.Length; //This is where the 0 and 1 come from

Therefore the different combinations would rearrange the letters, using the length of the inputted word as the base, then comparing it to a word list, I could find existing words.

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## marked as duplicate by Eren Ersönmez, L.B, Filburt, Jason Sturges, GravitonJul 18 '12 at 2:34

You should still post your code and ask specific questions. SO likes to see some effort in the question asker's part. –  Jay Riggs Jul 13 '12 at 5:37
I have edited your title. Please see, "Should questions include “tags” in their titles?", where the consensus is "no, they should not". –  John Saunders Jul 13 '12 at 5:38
I noted No repetitions. The link given is something different –  Paul Jul 13 '12 at 5:42
Nothing that I have made so far has done any good for this question. If I find something that can benefit this then I will post it. –  Paul Jul 13 '12 at 5:45

What you really need is a proper utilization of recursion. I think Permutations in C# Using Recursion is exactly what you are looking for.

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:O why a -1? what's wrong with this suggestion? just convert strings to numbers. nothing rocket science, or is it? –  Nero theZero Jul 13 '12 at 6:04
This has helped a lot... Thanks! –  Paul Jul 13 '12 at 6:05
@Jason753951, welcome. its much simpler. –  Nero theZero Jul 13 '12 at 6:10
This gives me something to think about... I was nowhere when I asked this question. –  Paul Jul 13 '12 at 6:14